On Hermitian Solutions of the Symmetric Algebraic Riccati Equation
In: SIAM Journal on Control and Optimization, Jg. 24 (1986-11-01), Heft 6, S. 1323-1334
Online
serialPeriodical
Zugriff:
The structure of the set of hermitian solutions of the matrix quadratic equation $XDX - XA - A^ * X - C = 0$ is studied under the conditions that $C = C^ * $, Dis positive semidefinite and $(A,D)$ is stabilizable. New features (e.g., nonexistence of the minimal solution) appear in contrast with the known case when $(A,D)$ is controllable.
Titel: |
On Hermitian Solutions of the Symmetric Algebraic Riccati Equation
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Zeitschrift: | SIAM Journal on Control and Optimization, Jg. 24 (1986-11-01), Heft 6, S. 1323-1334 |
Veröffentlichung: | 1986 |
Medientyp: | serialPeriodical |
ISSN: | 0363-0129 (print) ; 1095-7138 (print) |
DOI: | 10.1137/0324080 |
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